The set-theoretic Kaufmann-Clote question

Abstract

Let M be the set theory obtained from ZF by removing the collection scheme, restricting separation to 0-formulae and adding an axiom asserting that every set is contained in a transitive set. Let n-Collection denote the restriction of the collection scheme to n-formulae. In this paper we prove that for n ≥ 1, if M is a model of M+n-Collection+V=L and N is a n+1-elementary end extension of M that satisfies n-1-Colelction and that contains a new ordinal but no least new ordinal, then n+1-Collection holds in M. This result is used to show that for n ≥ 1, the minimum model of M+n-Collection has no n+1-elementary end extension that satisfies n-1-Collection, providing a negative answer to the generalisation of a question posed by Kaufmann.